We want to draw the graph of the given quadratic function. To do so, we will rewrite it in vertex form, f(x)=a(x-h)^2+k, where a, h, and k are either positive or negative numbers.
y=(x+4)^2-2
⇕
y=1(x-(-4))^2+(-2)
To draw the graph, we will follow four steps.
Plot any point on the curve and its reflection across the axis of symmetry.
Sketch the curve.
Let's get started.
Step 1
We will first identify the constants a, h, and k. Recall that if a<0, the parabola will open downwards. Conversely, if a>0, the parabola will open upwards.
Vertex Form:& f(x)= a(x- h)^2+k
Function:& y= 1(x-( - 4))^2+(- 2)
We can see that a= 1, h= - 4, and k=- 2. Since a is greater than 0, the parabola will open upwards.
Step 2
Let's now plot the vertex ( h,k) and draw the axis of symmetry x= h. Since we already know the values of h and k, we know that the vertex is ( - 4,- 2). Therefore, the axis of symmetry is the vertical line x= - 4.
Step 3
We will now plot a point on the curve by choosing an x-value and calculating its corresponding y-value. Let's try x=- 6.
